1. Geometry: This is an example of reflectional symmetry. It has one symmetric line through the center.
2. Triangles: Without color, the entire picture has a line of reflectional symmetry. If one takes one of the triangles in the middle of the picture, they have two lines of rotational symmetry.
3. Deltoidal Trihexagonal Tiling: Uses line designs and shapes to create a big image. Each big hexagon 3 lines of rotational symmetry.
4. Pinwheel Tesselation: Uses knot designs to weave a bunch of lines making several triangles.
5. Negative Space Stars: This has two lines of reflectional symmetry and two lines of rotational symmetry.
6. Untitled: Has a knot design that makes a star with one line of symmetry.
7. Icosahedron: A 3 dimensional figure that is made up of several triangles.
8. Mona Lisa: Without the picture of Mona Lisa and the fill ins, this would have 13 lines of rotational symmetry.
9. Untitled: Uses a knot design to make a star.
10. Infinite Patterns in Alabyzin: Each tower if you will has several hexagonal shapes connected together. If you one looks hard enough, they could find many shapes. It also has one line of reflectional symmetry.
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1. Geometry: This is an example of reflectional symmetry. It has one symmetric line through the center.
2. Triangles: Without color, the entire picture has a line of reflectional symmetry. If one takes one of the triangles in the middle of the picture, they have two lines of rotational symmetry.
3. Deltoidal Trihexagonal Tiling: Uses line designs and shapes to create a big image. Each big hexagon 3 lines of rotational symmetry.
4. Pinwheel Tesselation: Uses knot designs to weave a bunch of lines making several triangles.
5. Negative Space Stars: This has two lines of reflectional symmetry and two lines of rotational symmetry.
6. Untitled: Has a knot design that makes a star with one line of symmetry.
7. Icosahedron: A 3 dimensional figure that is made up of several triangles.
8. Mona Lisa: Without the picture of Mona Lisa and the fill ins, this would have 13 lines of rotational symmetry.
9. Untitled: Uses a knot design to make a star.
10. Infinite Patterns in Alabyzin: Each tower if you will has several hexagonal shapes connected together. If you one looks hard enough, they could find many shapes. It also has one line of reflectional symmetry.